Two sufficient conditions for graphs to admit path factors

Abstract

Let A be a set of connected graphs. Then a spanning subgraph A of G is called an A-factor if each component of A is isomorphic to some member of A. Especially, when every graph in A is a path, A is a path factor. For a positive integer d≥2, we write P≥ d=\Pi|i≥ d\. Then a P≥ d-factor means a path factor in which every component admits at least d vertices. A graph G is called a (P≥ d,m)-factor deleted graph if G-E' admits a P≥ d-factor for any E'⊂eq E(G) with |E'|=m. A graph G is called a (P≥ d,k)-factor critical graph if G-Q has a P≥ d-factor for any Q⊂eq V(G) with |Q|=k. In this paper, we present two degree conditions for graphs to be (P≥3,m)-factor deleted graphs and (P≥3,k)-factor critical graphs. Furthermore, we show that the two results are best possible in some sense.